Pure Unadulterated Power

Power is defined as the rate of which an amount of energy is used to accomplish
work. In the mechanical realm, we tend to use the term "horsepower" when
describing how much energy a engine can develop. In electronics, we use the
term
WATT
when describing the amount of power used by something.

As discussed in a previous class, whenever a given current flows through a wire
or device, it causes a form of electrical friction. We call this friction
RESISTANCE. This friction is caused by the moving of electrons through and
between molecules within the resistor. This friction causes 2 other effects:
Heat and Noise. The noise is called Johnson noise, and for now, we will ignore
this effect, as it is very negligible.

The speed, or rate at which the heat is generated defines the power that the
resistor consumes. This power consumption represents a loss, because we do not
make use of the heat that is dissipated. It becomes important to know how much
power a resistor is dissipating, because it will burn up if it can not
withstand the heat. For this reason, resistors have both a resistance rating
in Ohms, and a power rating in Watts. A resistor which is rated at 2 watts can
safely dissipate 2 watts. If a 2 watt resistor is forced to dissipate 5 watts,
it will burn up, and its resistance value will change accordingly.

The question then arises, "How do we calculate the amount of power dissipated
by a resistor?"

I Thought you'd never ask!

The formula for power is not unlike Ohm's Law. As a matter of fact, it is
called Ohm's Watts Law. And remembering the formula for Power is a piece of
pie!

(Don't I mean a piece of cake?)

Nope.... PIE! You see, Power (P) is equal to the product of the Current (I),
and the Voltage (E) in a given circuit.

Of course, using algebra, you can derive 2 other formula's from this one.

and

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